scholarly journals Better numerical approximation by λ-Durrmeyer-Bernstein type operators

Filomat ◽  
2021 ◽  
Vol 35 (4) ◽  
pp. 1405-1419
Author(s):  
Voichiţa Radu ◽  
Purshottam Agrawal ◽  
Jitendra Singh
Keyword(s):  
Numerical Approximation ◽  
Modulus Of Smoothness ◽  
Asymptotic Formulas ◽  
Bernstein Type ◽  
Mixed Modulus Of Smoothness ◽  
Differentiable Functions ◽  
Mixed Modulus ◽  
Bivariate Operators ◽  
Durrmeyer Variant ◽  
Theoretical Results

The main object of this paper is to construct a new Durrmeyer variant of the ?-Bernstein type operators which have better features than the classical one. Some results concerning the rate of convergence in terms of the first and second moduli of continuity and asymptotic formulas of these operators are given. Moreover, we define a bivariate case of these operators and investigate the approximation degree by means of the total and partial modulus of continuity and the Peetre?s K-functional. A Voronovskaja type asymptotic and Gr?ss-Voronovskaja theorem for the bivariate operators is also proven. Further, we introduce the associated GBS (Generalized Boolean Sum) operators and determine the order of convergence with the aid of the mixed modulus of smoothness for the B?gel continuous and B?gel differentiable functions. Finally the theoretical results are analyzed by numerical examples.

scholarly journals Bivariate α,q-Bernstein–Kantorovich Operators and GBS Operators of Bivariate α,q-Bernstein–Kantorovich Type

Mathematics ◽  
2019 ◽  
Vol 7 (12) ◽  
pp. 1161 ◽  
Author(s):  
Qing-Bo Cai ◽  
Wen-Tao Cheng ◽  
Bayram Çekim
Keyword(s):  
Degree Of Approximation ◽  
Modulus Of Smoothness ◽  
Moduli Of Continuity ◽  
Mixed Modulus Of Smoothness ◽  
Differentiable Functions ◽  
Gbs Operators ◽  
Mixed Modulus ◽  
Bivariate Operators ◽  
Kantorovich Operators ◽  
Boolean Sum

In this paper, we introduce a family of bivariate α , q -Bernstein–Kantorovich operators and a family of G B S (Generalized Boolean Sum) operators of bivariate α , q -Bernstein–Kantorovich type. For the former, we obtain the estimate of moments and central moments, investigate the degree of approximation for these bivariate operators in terms of the partial moduli of continuity and Peetre’s K-functional. For the latter, we estimate the rate of convergence of these G B S operators for B-continuous and B-differentiable functions by using the mixed modulus of smoothness.

scholarly journals On the Approximation Properties of q − Analogue Bivariate λ -Bernstein Type Operators

2020 ◽  
Vol 2020 ◽  
pp. 1-11
Author(s):  
Edmond Aliaga ◽  
Behar Baxhaku
Keyword(s):  
Type Theorem ◽  
Degree Of Approximation ◽  
Modulus Of Smoothness ◽  
Approximation Properties ◽  
Bernstein Type ◽  
Matlab Software ◽  
Type Space ◽  
Mixed Modulus Of Smoothness ◽  
Mixed Modulus ◽  
Boolean Sum

In this article, we establish an extension of the bivariate generalization of the q -Bernstein type operators involving parameter λ and extension of GBS (Generalized Boolean Sum) operators of bivariate q -Bernstein type. For the first operators, we state the Volkov-type theorem and we obtain a Voronovskaja type and investigate the degree of approximation by means of the Lipschitz type space. For the GBS type operators, we establish their degree of approximation in terms of the mixed modulus of smoothness. The comparison of convergence of the bivariate q -Bernstein type operators based on parameters and its GBS type operators is shown by illustrative graphics using MATLAB software.

Bivariate q-Bernstein–Chlodowsky–Durrmeyer type operators and the associated GBS operators

2019 ◽  
Vol 13 (05) ◽  
pp. 2050091
Author(s):  
Tarul Garg ◽  
Nurhayat İspir ◽  
P. N. Agrawal
Keyword(s):  
Lipschitz Space ◽  
Continuous Functions ◽  
Modulus Of Smoothness ◽  
Approximation Properties ◽  
Space Of Continuous Functions ◽  
Mixed Modulus Of Smoothness ◽  
Gbs Operators ◽  
Durrmeyer Type Operators ◽  
Mixed Modulus ◽  
Bivariate Operators

This paper deals with the approximation properties of the [Formula: see text]-bivariate Bernstein–Chlodowsky operators of Durrmeyer type. We investigate the approximation degree of the [Formula: see text]-bivariate operators for continuous functions in Lipschitz space and also with the help of partial modulus of continuity. Further, the Generalized Boolean Sum (GBS) operator of these bivariate [Formula: see text]–Bernstein–Chlodowsky–Durrmeyer operators is introduced and the rate of convergence in the Bögel space of continuous functions by means of the Lipschitz class and the mixed modulus of smoothness is examined. Furthermore, the convergence and its comparisons are shown by illustrative graphics for the [Formula: see text]-bivariate operators and the associated GBS operators to certain functions using Maple algorithms.

scholarly journals A new kind of Bi-variate $ \lambda $ -Bernstein-Kantorovich type operator with shifted knots and its associated GBS form

2021 ◽  
Vol 0 (0) ◽  
pp. 0
Author(s):  
Purshottam Narain Agrawal ◽  
Behar Baxhaku ◽  
Rahul Shukla
Keyword(s):  
Rate Of Convergence ◽  
Type Theorem ◽  
Degree Of Approximation ◽  
Modulus Of Smoothness ◽  
Type Operator ◽  
Mixed Modulus Of Smoothness ◽  
Voronovskaja Type Theorem ◽  
Differentiable Functions ◽  
Mixed Modulus ◽  
Approximation Of A Function

<p style='text-indent:20px;'>In this paper, we introduce a bi-variate case of a new kind of <inline-formula><tex-math id="M1">\begin{document}$ \lambda $\end{document}</tex-math></inline-formula>-Bernstein-Kantorovich type operator with shifted knots defined by Rahman et al. [<xref ref-type="bibr" rid="b31">31</xref>]. The rate of convergence of the bi-variate operators is obtained in terms of the complete and partial moduli of continuity. Next, we give an error estimate in the approximation of a function in the Lipschitz class and establish a Voronovskaja type theorem. Also, we define the associated GBS(Generalized Boolean Sum) operators and study the degree of approximation of Bögel continuous and Bögel differentiable functions by these operators with the aid of the mixed modulus of smoothness. Finally, we show the rate of convergence of the bi-variate operators and their GBS case for certain functions by illustrative graphics and tables using MATLAB algorithms.</p>

scholarly journals Quantitative estimates for the tensor product (p,q)-Balázs-Szabados operators and associated generalized Boolean sum operators

Filomat ◽  
2020 ◽  
Vol 34 (3) ◽  
pp. 779-793
Author(s):  
Esma Özkan
Keyword(s):  
Tensor Product ◽  
Modulus Of Continuity ◽  
Continuous Functions ◽  
Modulus Of Smoothness ◽  
Mixed Modulus Of Smoothness ◽  
Quantitative Estimates ◽  
Gbs Operators ◽  
Mixed Modulus ◽  
Boolean Sum ◽  
Second Modulus Of Continuity

In this study, we give some approximation results for the tensor product of (p,q)-Bal?zs-Szabados operators associated generalized Boolean sum (GBS) operators. Firstly, we introduce tensor product (p,q)-Bal?zs-Szabados operators and give an uniform convergence theorem of these operators on compact rectangular regions with an illustrative example. Then we estimate the approximation for the tensor product (p,q)-Bal?zs-Szabados operators in terms of the complete modulus of continuity, the partial modulus of continuity, Lipschitz functions and Petree?s K-functional corresponding to the second modulus of continuity. After that, we introduce the GBS operators associated the tensor product (p,q)-Bal?zs-Szabados operators. Finally, we improve the rate of smoothness by the mixed modulus of smoothness and Lipschitz class of B?gel continuous functions for the GBS operators.

scholarly journals Approximation by bivariate generalized Bernstein–Schurer operators and associated GBS operators

2020 ◽  
Vol 2020 (1) ◽  
Author(s):  
S. A. Mohiuddine
Keyword(s):  
Rate Of Convergence ◽  
Differentiable Function ◽  
Type Theorem ◽  
Modulus Of Smoothness ◽  
Order Of Approximation ◽  
Mixed Modulus Of Smoothness ◽  
Voronovskaja Type Theorem ◽  
Gbs Operators ◽  
Mixed Modulus ◽  
Boolean Sum

AbstractWe construct the bivariate form of Bernstein–Schurer operators based on parameter α. We establish the Voronovskaja-type theorem and give an estimate of the order of approximation with the help of Peetre’s K-functional of our newly defined operators. Moreover, we define the associated generalized Boolean sum (shortly, GBS) operators and estimate the rate of convergence by means of mixed modulus of smoothness. Finally, the order of approximation for Bögel differentiable function of our GBS operators is presented.

Sign in / Sign up

Export Citation Format

Share Document